Solve for t. {:[(7)/(3)=(4)/(t)],[t=]:}

Write Equation: Write down the given equation. We have the equation (7/3) = (4/t).Cross-Multiply: Cross-multiply to solve for t. Cross-multiplication gives us 7 * t = 4 * 3.Perform Multiplication: Perform the multiplication on the right side of the equation. 7 * t = 12.Divide for t: Divide both sides of the equation by 7 to solve for t. t = 12 / 7.Simplify Fraction: Simplify the fraction if possible. t = 12 / 7 cannot be simplified further.

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Solve for
t.

{:[(7)/(3)=(4)/(t)],[t=]:}

Solve for $t$ . $\newline$ $\begin{array}{l} \frac{7}{3}=\frac{4}{t} \\ t= \end{array}$

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Math Problems

Grade 6

Multiply using the distributive property

Full solution

Q. Solve for

t

\newline

\begin{array}{l} \frac{7}{3}=\frac{4}{t} \\ t= \end{array}

Write Equation: Write down the given equation. $\newline$ We have the equation $(\frac{7}{3}) = (\frac{4}{t})$ .
Cross-Multiply: Cross-multiply to solve for $t$ . Cross-multiplication gives us $7 \times t = 4 \times 3$ .
Perform Multiplication: Perform the multiplication on the right side of the equation. $7 \times t = 12$ .
Divide for $t$ : Divide both sides of the equation by $7$ to solve for $t$ . $t = \frac{12}{7}$ .
Simplify Fraction: Simplify the fraction if possible. $t = \frac{12}{7}$ cannot be simplified further.